The dynamics of the variable ywith respect to variable xis described by the following stiff ODE: dy + 50 (y - cos (x)) = 0 where y (0) = 1 dx The exact solution is given as: y (x) = 3.998 X 10 -4...

Solve using Euler Modified Method

The dynamics of the variable ywith respect to variable xis<br>described by the following stiff ODE:<br>dy<br>+ 50 (y - cos (x)) = 0<br>where y (0) = 1<br>dx<br>The exact solution is given as:<br>y (x) = 3.998 X 10 -4 exp(-50x) + 0.9998 cos (x – 0.02)<br>Use the modified Euler numerical algorithm for solving<br>stiff ODES to find the value of y(o.75), using 3 integration<br>steps.<br>Compare your calculated result with the exact solution<br>and calculate the minimum number of correct significant<br>digits in your answer.<br>Note: all calculations should be done in the RADIAN<br>mode.<br>

Extracted text: The dynamics of the variable ywith respect to variable xis described by the following stiff ODE: dy + 50 (y - cos (x)) = 0 where y (0) = 1 dx The exact solution is given as: y (x) = 3.998 X 10 -4 exp(-50x) + 0.9998 cos (x – 0.02) Use the modified Euler numerical algorithm for solving stiff ODES to find the value of y(o.75), using 3 integration steps. Compare your calculated result with the exact solution and calculate the minimum number of correct significant digits in your answer. Note: all calculations should be done in the RADIAN mode.

Jun 04, 2022

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The dynamics of the variable ywith respect to variable xis described by the following stiff ODE: dy + 50 (y - cos (x)) = 0 where y (0) = 1 dx The exact solution is given as: y (x) = 3.998 X 10 -4...

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